An O(k2 + kh2 + h4) arithmetic average discretization for the solution of 1‐D nonlinear parabolic equations |
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| Authors: | R. K. Mohanty Samir Karaa Urvashi Arora |
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| Affiliation: | 1. Department of Mathematics, Faculty of Mathematical Sciences, University of Delhi, Delhi 110 007, IndiaDepartment of Mathematical Sciences, Faculty of Mathematical Sciences, University of Delhi, Delhi 110 007, India;2. Department of Mathematics and Statistics, Sultan Qaboos University, PO Box 36, Al‐Khod 123, Muscat, Sultanate of Oman;3. Department of Mathematics, Rajdhani College, University of Delhi, New Delhi 110 015, India |
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| Abstract: | This article develops a new two‐level three‐point implicit finite difference scheme of order 2 in time and 4 in space based on arithmetic average discretization for the solution of nonlinear parabolic equation ε uxx = f(x, t, u, ux, ut), 0 < x < 1, t > 0 subject to appropriate initial and Dirichlet boundary conditions, where ε > 0 is a small positive constant. We also propose a new explicit difference scheme of order 2 in time and 4 in space for the estimates of (?u/?x). The main objective is the proposed formulas are directly applicable to both singular and nonsingular problems. We do not require any fictitious points outside the solution region and any special technique to handle the singular problems. Stability analysis of a model problem is discussed. Numerical results are provided to validate the usefulness of the proposed formulas. © 2006 Wiley Periodicals, Inc. Numer Methods Partial Differential Eq, 2007 |
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| Keywords: | arithmetic average discretization nonlinear parabolic equation implicit scheme singular problem diffusion‐convection equation Burgers' equation RMS errors |
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